Deep Convolutional GAN (DCGAN)

Goal

In this notebook, you're going to create another GAN using the MNIST dataset. You will implement a Deep Convolutional GAN (DCGAN), a very successful and influential GAN model developed in 2015.

Note: here is the paper if you are interested! It might look dense now, but soon you'll be able to understand many parts of it :)

Learning Objectives

  1. Get hands-on experience making a widely used GAN: Deep Convolutional GAN (DCGAN).
  2. Train a powerful generative model.

Generator architecture

Figure: Architectural drawing of a generator from DCGAN from Radford et al (2016).

Getting Started

DCGAN

Here are the main features of DCGAN (don't worry about memorizing these, you will be guided through the implementation!):

  • Use convolutions without any pooling layers
  • Use batchnorm in both the generator and the discriminator
  • Don't use fully connected hidden layers
  • Use ReLU activation in the generator for all layers except for the output, which uses a Tanh activation.
  • Use LeakyReLU activation in the discriminator for all layers except for the output, which does not use an activation

You will begin by importing some useful packages and data that will help you create your GAN. You are also provided a visualizer function to help see the images your GAN will create.

In [1]:
import torch
from torch import nn
from tqdm.auto import tqdm
from torchvision import transforms
from torchvision.datasets import MNIST
from torchvision.utils import make_grid
from torch.utils.data import DataLoader
import matplotlib.pyplot as plt
torch.manual_seed(0) # Set for testing purposes, please do not change!


def show_tensor_images(image_tensor, num_images=25, size=(1, 28, 28)):
    '''
    Function for visualizing images: Given a tensor of images, number of images, and
    size per image, plots and prints the images in an uniform grid.
    '''
    image_tensor = (image_tensor + 1) / 2
    image_unflat = image_tensor.detach().cpu()
    image_grid = make_grid(image_unflat[:num_images], nrow=5)
    plt.imshow(image_grid.permute(1, 2, 0).squeeze())
    plt.show()

Generator

The first component you will make is the generator. You may notice that instead of passing in the image dimension, you will pass the number of image channels to the generator. This is because with DCGAN, you use convolutions which don’t depend on the number of pixels on an image. However, the number of channels is important to determine the size of the filters.

You will build a generator using 4 layers (3 hidden layers + 1 output layer). As before, you will need to write a function to create a single block for the generator's neural network. Since in DCGAN the activation function will be different for the output layer, you will need to check what layer is being created. You are supplied with some tests following the code cell so you can see if you're on the right track!

At the end of the generator class, you are given a forward pass function that takes in a noise vector and generates an image of the output dimension using your neural network. You are also given a function to create a noise vector. These functions are the same as the ones from the last assignment.

Optional hint for make_gen_block 1. You'll find [nn.ConvTranspose2d](https://pytorch.org/docs/master/generated/torch.nn.ConvTranspose2d.html) and [nn.BatchNorm2d](https://pytorch.org/docs/master/generated/torch.nn.BatchNorm2d.html) useful!
In [2]:
# UNQ_C1 (UNIQUE CELL IDENTIFIER, DO NOT EDIT)
# GRADED FUNCTION: Generator
class Generator(nn.Module):
    '''
    Generator Class
    Values:
        z_dim: the dimension of the noise vector, a scalar
        im_chan: the number of channels in the images, fitted for the dataset used, a scalar
              (MNIST is black-and-white, so 1 channel is your default)
        hidden_dim: the inner dimension, a scalar
    '''
    def __init__(self, z_dim=10, im_chan=1, hidden_dim=64):
        super(Generator, self).__init__()
        self.z_dim = z_dim
        # Build the neural network
        self.gen = nn.Sequential(
            self.make_gen_block(z_dim, hidden_dim * 4),
            self.make_gen_block(hidden_dim * 4, hidden_dim * 2, kernel_size=4, stride=1),
            self.make_gen_block(hidden_dim * 2, hidden_dim),
            self.make_gen_block(hidden_dim, im_chan, kernel_size=4, final_layer=True),
        )

    def make_gen_block(self, input_channels, output_channels, kernel_size=3, stride=2, final_layer=False):
        '''
        Function to return a sequence of operations corresponding to a generator block of DCGAN, 
        corresponding to a transposed convolution, a batchnorm (except for in the last layer), and an activation.
        Parameters:
            input_channels: how many channels the input feature representation has
            output_channels: how many channels the output feature representation should have
            kernel_size: the size of each convolutional filter, equivalent to (kernel_size, kernel_size)
            stride: the stride of the convolution
            final_layer: a boolean, true if it is the final layer and false otherwise 
                      (affects activation and batchnorm)
        '''

        #     Steps:
        #       1) Do a transposed convolution using the given parameters.
        #       2) Do a batchnorm, except for the last layer.
        #       3) Follow each batchnorm with a ReLU activation.
        #       4) If its the final layer, use a Tanh activation after the deconvolution.

        # Build the neural block
        if not final_layer:
            return nn.Sequential(
                #### START CODE HERE ####
                # Use convolutions without any pooling layers
                nn.ConvTranspose2d(input_channels, output_channels, kernel_size = kernel_size, stride = stride),
                # Use batchnorm in both the generator and the discriminator
                nn.BatchNorm2d(output_channels),
                # Don't use fully connected hidden layers
                # Use ReLU activation in the generator for all layers except for the output, which uses a Tanh activation.
                nn.ReLU(inplace = True)
                #### END CODE HERE ####
            )
        else: # Final Layer
            return nn.Sequential(
                #### START CODE HERE ####
                nn.ConvTranspose2d(input_channels, output_channels, kernel_size = kernel_size, stride = stride),
                # max = 1 and min = -1, it is a tanh()
                nn.Tanh()
                #### END CODE HERE ####
            )

    def unsqueeze_noise(self, noise):
        '''
        Function for completing a forward pass of the generator: Given a noise tensor, 
        returns a copy of that noise with width and height = 1 and channels = z_dim.
        Parameters:
            noise: a noise tensor with dimensions (n_samples, z_dim)
        '''
        return noise.view(len(noise), self.z_dim, 1, 1)

    def forward(self, noise):
        '''
        Function for completing a forward pass of the generator: Given a noise tensor, 
        returns generated images.
        Parameters:
            noise: a noise tensor with dimensions (n_samples, z_dim)
        '''
        x = self.unsqueeze_noise(noise)
        return self.gen(x)

def get_noise(n_samples, z_dim, device='cpu'):
    '''
    Function for creating noise vectors: Given the dimensions (n_samples, z_dim)
    creates a tensor of that shape filled with random numbers from the normal distribution.
    Parameters:
        n_samples: the number of samples to generate, a scalar
        z_dim: the dimension of the noise vector, a scalar
        device: the device type
    '''
    return torch.randn(n_samples, z_dim, device=device)
In [3]:
# UNQ_C2 (UNIQUE CELL IDENTIFIER, DO NOT EDIT)
'''
Test your make_gen_block() function
'''
gen = Generator()
num_test = 100

# Test the hidden block
test_hidden_noise = get_noise(num_test, gen.z_dim)
test_hidden_block = gen.make_gen_block(10, 20, kernel_size=4, stride=1)
test_uns_noise = gen.unsqueeze_noise(test_hidden_noise)
hidden_output = test_hidden_block(test_uns_noise)

# Check that it works with other strides
test_hidden_block_stride = gen.make_gen_block(20, 20, kernel_size=4, stride=2)

test_final_noise = get_noise(num_test, gen.z_dim) * 20
test_final_block = gen.make_gen_block(10, 20, final_layer=True)
test_final_uns_noise = gen.unsqueeze_noise(test_final_noise)
final_output = test_final_block(test_final_uns_noise)

# Test the whole thing:
test_gen_noise = get_noise(num_test, gen.z_dim)
test_uns_gen_noise = gen.unsqueeze_noise(test_gen_noise)
gen_output = gen(test_uns_gen_noise)

Here's the test for your generator block:

In [4]:
# UNIT TESTS
assert tuple(hidden_output.shape) == (num_test, 20, 4, 4)
assert hidden_output.max() > 1
assert hidden_output.min() == 0
assert hidden_output.std() > 0.2
assert hidden_output.std() < 1
assert hidden_output.std() > 0.5

assert tuple(test_hidden_block_stride(hidden_output).shape) == (num_test, 20, 10, 10)

assert final_output.max().item() == 1
assert final_output.min().item() == -1

assert tuple(gen_output.shape) == (num_test, 1, 28, 28)
assert gen_output.std() > 0.5
assert gen_output.std() < 0.8
print("Success!")
Success!

Discriminator

The second component you need to create is the discriminator.

You will use 3 layers in your discriminator's neural network. Like with the generator, you will need create the function to create a single neural network block for the discriminator. There are also tests at the end for you to use.

Optional hint for make_disc_block 1. You'll find [nn.Conv2d](https://pytorch.org/docs/master/generated/torch.nn.Conv2d.html), [nn.BatchNorm2d](https://pytorch.org/docs/master/generated/torch.nn.BatchNorm2d.html), and [nn.LeakyReLU](https://pytorch.org/docs/master/generated/torch.nn.LeakyReLU.html) useful!
In [14]:
# UNQ_C3 (UNIQUE CELL IDENTIFIER, DO NOT EDIT)
# GRADED FUNCTION: Discriminator
class Discriminator(nn.Module):
    '''
    Discriminator Class
    Values:
        im_chan: the number of channels in the images, fitted for the dataset used, a scalar
              (MNIST is black-and-white, so 1 channel is your default)
    hidden_dim: the inner dimension, a scalar
    '''
    def __init__(self, im_chan=1, hidden_dim=16):
        super(Discriminator, self).__init__()
        self.disc = nn.Sequential(
            self.make_disc_block(im_chan, hidden_dim),
            self.make_disc_block(hidden_dim, hidden_dim * 2),
            self.make_disc_block(hidden_dim * 2, 1, final_layer=True),
        )

    def make_disc_block(self, input_channels, output_channels, kernel_size=4, stride=2, final_layer=False):
        '''
        Function to return a sequence of operations corresponding to a discriminator block of DCGAN, 
        corresponding to a convolution, a batchnorm (except for in the last layer), and an activation.
        Parameters:
            input_channels: how many channels the input feature representation has
            output_channels: how many channels the output feature representation should have
            kernel_size: the size of each convolutional filter, equivalent to (kernel_size, kernel_size)
            stride: the stride of the convolution
            final_layer: a boolean, true if it is the final layer and false otherwise 
                      (affects activation and batchnorm)
        '''
        #     Steps:
        #       1) Add a convolutional layer using the given parameters.
        #       2) Do a batchnorm, except for the last layer.
        #       3) Follow each batchnorm with a LeakyReLU activation with slope 0.2.
        
        # Build the neural block
        if not final_layer:
            return nn.Sequential(
                #### START CODE HERE #### #
                # Use convolutions without any pooling layers
                nn.Conv2d(input_channels, output_channels, kernel_size = kernel_size, stride = stride),
                # Use batchnorm in both the generator and the discriminator
                nn.BatchNorm2d(output_channels),
                # Don't use fully connected hidden layers
                # Use LeakyReLU activation in the discriminator for all layers except for the output, which does not use an activation
                nn.LeakyReLU(0.2, inplace = True)
                #### END CODE HERE ####
            )
        else: # Final Layer
            return nn.Sequential(
                #### START CODE HERE #### #
                nn.Conv2d(input_channels, output_channels, kernel_size = kernel_size, stride = stride),
                #### END CODE HERE ####
            )

    def forward(self, image):
        '''
        Function for completing a forward pass of the discriminator: Given an image tensor, 
        returns a 1-dimension tensor representing fake/real.
        Parameters:
            image: a flattened image tensor with dimension (im_dim)
        '''
        disc_pred = self.disc(image)
        return disc_pred.view(len(disc_pred), -1)
In [15]:
# UNQ_C4 (UNIQUE CELL IDENTIFIER, DO NOT EDIT)
'''
Test your make_disc_block() function
'''
num_test = 100

gen = Generator()
disc = Discriminator()
test_images = gen(get_noise(num_test, gen.z_dim))

# Test the hidden block
test_hidden_block = disc.make_disc_block(1, 5, kernel_size=6, stride=3)
hidden_output = test_hidden_block(test_images)

# Test the final block
test_final_block = disc.make_disc_block(1, 10, kernel_size=2, stride=5, final_layer=True)
final_output = test_final_block(test_images)

# Test the whole thing:
disc_output = disc(test_images)

Here's a test for your discriminator block:

In [16]:
# Test the hidden block
assert tuple(hidden_output.shape) == (num_test, 5, 8, 8)
# Because of the LeakyReLU slope
assert -hidden_output.min() / hidden_output.max() > 0.15
assert -hidden_output.min() / hidden_output.max() < 0.25
assert hidden_output.std() > 0.5
assert hidden_output.std() < 1

# Test the final block

assert tuple(final_output.shape) == (num_test, 10, 6, 6)
assert final_output.max() > 1.0
assert final_output.min() < -1.0
assert final_output.std() > 0.3
assert final_output.std() < 0.6

# Test the whole thing:

assert tuple(disc_output.shape) == (num_test, 1)
assert disc_output.std() > 0.25
assert disc_output.std() < 0.5
print("Success!")
Success!

Training

Now you can put it all together! Remember that these are your parameters:

  • criterion: the loss function
  • n_epochs: the number of times you iterate through the entire dataset when training
  • z_dim: the dimension of the noise vector
  • display_step: how often to display/visualize the images
  • batch_size: the number of images per forward/backward pass
  • lr: the learning rate
  • beta_1, beta_2: the momentum term
  • device: the device type
In [17]:
criterion = nn.BCEWithLogitsLoss()
z_dim = 64
display_step = 500
batch_size = 128
# A learning rate of 0.0002 works well on DCGAN
lr = 0.0002

# These parameters control the optimizer's momentum, which you can read more about here:
# https://distill.pub/2017/momentum/ but you don’t need to worry about it for this course!
beta_1 = 0.5 
beta_2 = 0.999
device = 'cuda'

# You can tranform the image values to be between -1 and 1 (the range of the tanh activation)
transform = transforms.Compose([
    transforms.ToTensor(),
    transforms.Normalize((0.5,), (0.5,)),
])

dataloader = DataLoader(
    MNIST('.', download=False, transform=transform),
    batch_size=batch_size,
    shuffle=True)

Then, you can initialize your generator, discriminator, and optimizers.

In [18]:
gen = Generator(z_dim).to(device)
gen_opt = torch.optim.Adam(gen.parameters(), lr=lr, betas=(beta_1, beta_2))
disc = Discriminator().to(device) 
disc_opt = torch.optim.Adam(disc.parameters(), lr=lr, betas=(beta_1, beta_2))

# You initialize the weights to the normal distribution
# with mean 0 and standard deviation 0.02
def weights_init(m):
    if isinstance(m, nn.Conv2d) or isinstance(m, nn.ConvTranspose2d):
        torch.nn.init.normal_(m.weight, 0.0, 0.02)
    if isinstance(m, nn.BatchNorm2d):
        torch.nn.init.normal_(m.weight, 0.0, 0.02)
        torch.nn.init.constant_(m.bias, 0)
gen = gen.apply(weights_init)
disc = disc.apply(weights_init)

Finally, you can train your GAN! For each epoch, you will process the entire dataset in batches. For every batch, you will update the discriminator and generator. Then, you can see DCGAN's results!

Here's roughly the progression you should be expecting. On GPU this takes about 30 seconds per thousand steps. On CPU, this can take about 8 hours per thousand steps. You might notice that in the image of Step 5000, the generator is disproprotionately producing things that look like ones. If the discriminator didn't learn to detect this imbalance quickly enough, then the generator could just produce more ones. As a result, it may have ended up tricking the discriminator so well that there would be no more improvement, known as mode collapse: MNIST Digits Progression

In [19]:
n_epochs = 50
cur_step = 0
mean_generator_loss = 0
mean_discriminator_loss = 0
for epoch in range(n_epochs):
    # Dataloader returns the batches
    for real, _ in tqdm(dataloader):
        cur_batch_size = len(real)
        real = real.to(device)

        ## Update discriminator ##
        disc_opt.zero_grad()
        fake_noise = get_noise(cur_batch_size, z_dim, device=device)
        fake = gen(fake_noise)
        disc_fake_pred = disc(fake.detach())
        disc_fake_loss = criterion(disc_fake_pred, torch.zeros_like(disc_fake_pred))
        disc_real_pred = disc(real)
        disc_real_loss = criterion(disc_real_pred, torch.ones_like(disc_real_pred))
        disc_loss = (disc_fake_loss + disc_real_loss) / 2

        # Keep track of the average discriminator loss
        mean_discriminator_loss += disc_loss.item() / display_step
        # Update gradients
        disc_loss.backward(retain_graph=True)
        # Update optimizer
        disc_opt.step()

        ## Update generator ##
        gen_opt.zero_grad()
        fake_noise_2 = get_noise(cur_batch_size, z_dim, device=device)
        fake_2 = gen(fake_noise_2)
        disc_fake_pred = disc(fake_2)
        gen_loss = criterion(disc_fake_pred, torch.ones_like(disc_fake_pred))
        gen_loss.backward()
        gen_opt.step()

        # Keep track of the average generator loss
        mean_generator_loss += gen_loss.item() / display_step

        ## Visualization code ##
        if cur_step % display_step == 0 and cur_step > 0:
            print(f"Step {cur_step}: Generator loss: {mean_generator_loss}, discriminator loss: {mean_discriminator_loss}")
            show_tensor_images(fake)
            show_tensor_images(real)
            mean_generator_loss = 0
            mean_discriminator_loss = 0
        cur_step += 1

Step 500: Generator loss: 1.039162176847457, discriminator loss: 0.4903915259838106

Step 1000: Generator loss: 2.5119718554019927, discriminator loss: 0.11473329589515932

Step 1500: Generator loss: 1.9843244815170773, discriminator loss: 0.3921532267592848

Step 2000: Generator loss: 1.3071328675150875, discriminator loss: 0.4675988227128982

Step 2500: Generator loss: 1.0614661858081813, discriminator loss: 0.538539134502411

Step 3000: Generator loss: 0.9214359277486792, discriminator loss: 0.5846015675663946

Step 3500: Generator loss: 0.8657248426675791, discriminator loss: 0.6140519082546235

Step 4000: Generator loss: 0.8497938542366024, discriminator loss: 0.6252693525552746

Step 4500: Generator loss: 0.838187743723392, discriminator loss: 0.6349866538047788

Step 5000: Generator loss: 0.8203227133154867, discriminator loss: 0.6447558985948565

Step 5500: Generator loss: 0.8111477699875829, discriminator loss: 0.6522645691633225

Step 6000: Generator loss: 0.7992752498388287, discriminator loss: 0.6564938886165625

Step 6500: Generator loss: 0.7930228852629656, discriminator loss: 0.6622794559001922

Step 7000: Generator loss: 0.7702637377977382, discriminator loss: 0.6696277567148206

Step 7500: Generator loss: 0.7630379182696351, discriminator loss: 0.6734475395679466


Step 8000: Generator loss: 0.7671562925577163, discriminator loss: 0.6758904364109037

Step 8500: Generator loss: 0.7582073706984515, discriminator loss: 0.6802598320245739

Step 9000: Generator loss: 0.7472889531850815, discriminator loss: 0.6830747916698454

Step 9500: Generator loss: 0.7460100267529483, discriminator loss: 0.685151623725891

Step 10000: Generator loss: 0.7400616637468342, discriminator loss: 0.6884987447261808

Step 10500: Generator loss: 0.7363025429248812, discriminator loss: 0.6885633740425113

Step 11000: Generator loss: 0.7367196044325833, discriminator loss: 0.6908391571044932

Step 11500: Generator loss: 0.7280115127563477, discriminator loss: 0.692932461380959

Step 12000: Generator loss: 0.7287813370823865, discriminator loss: 0.6933189951181408

Step 12500: Generator loss: 0.7211565566658976, discriminator loss: 0.6936551969051349

Step 13000: Generator loss: 0.7191162796020505, discriminator loss: 0.695446728467942

Step 13500: Generator loss: 0.7175268031358717, discriminator loss: 0.6967406530380252

Step 14000: Generator loss: 0.7145078861117365, discriminator loss: 0.6970946620702738

Step 14500: Generator loss: 0.7102476602196688, discriminator loss: 0.6993860819339757

Step 15000: Generator loss: 0.7099964455366127, discriminator loss: 0.6995188724994663


Step 15500: Generator loss: 0.7063225344419484, discriminator loss: 0.6994176369905475

Step 16000: Generator loss: 0.7049701387882238, discriminator loss: 0.6994658303260799

Step 16500: Generator loss: 0.7067116172909739, discriminator loss: 0.698587339520454

Step 17000: Generator loss: 0.7009744629263871, discriminator loss: 0.6993934268951414

Step 17500: Generator loss: 0.7046449977159495, discriminator loss: 0.6988891893625248

Step 18000: Generator loss: 0.7025484004020697, discriminator loss: 0.6979969830513006

Step 18500: Generator loss: 0.6960088539123539, discriminator loss: 0.7008228665590287

Step 19000: Generator loss: 0.696261163473129, discriminator loss: 0.698779834508896

Step 19500: Generator loss: 0.7006299566030499, discriminator loss: 0.6975026639699932

Step 20000: Generator loss: 0.7027984480857854, discriminator loss: 0.6976351588964467

Step 20500: Generator loss: 0.6996543604135517, discriminator loss: 0.6976356679201119

Step 21000: Generator loss: 0.7008534002900128, discriminator loss: 0.6974384694099425

Step 21500: Generator loss: 0.6998786994218834, discriminator loss: 0.6971454685926436

Step 22000: Generator loss: 0.6991295003890986, discriminator loss: 0.6969179351329803

Step 22500: Generator loss: 0.6994082635641103, discriminator loss: 0.6970621656179428


Step 23000: Generator loss: 0.6985652548670772, discriminator loss: 0.6965146113634102

In [ ]: